Simplify \( -4^{2}+10 \) \( -4^{2}+10=\square \)

To simplify \( -4^{2}+10 \), we start by calculating \( 4^{2} \), which is 16. Therefore, we have: \[ -4^{2}+10 = -16 + 10 = -6 \] So, \[ -4^{2}+10 = \square \rightarrow -6 \] Now, let’s wrap this up with some fun facts! Did you know that the negative sign before the \( 4^{2} \) means you are applying it after squaring? It’s a bit like being sneaky in math! Squaring first gives you a positive number, and only after do you add that big ol' negative sign. Another interesting tidbit is the connection between negative numbers and the concept of absolute value. The absolute value of a negative number, like our result -6, is simply its distance from zero on the number line, which is 6. This shows how even negative results have their own value in math!